Towards the Erdős matching conjecture for 4-uniform hypergraphs: stability and applications

Abstract

A famous conjecture of Erdős asserts that for k 3, the maximum number of edges in an n-vertex k-uniform hypergraph without s+1 pairwise disjoint edges is \nk-n-sk,sk+k-1k\. This problem has been central in extremal combinatorics, with substantial progress in the literature, including a complete solution for k=3 due to the first author. In this paper, we make progress towards the 4-uniform case, proving the conjecture for n 5s and sufficiently large n, thereby taking a first step analogous to the 3-uniform case. The main technical contribution is a stability result of independent interest. We further apply this stability to resolve two new instances of conjectures on the minimum d-degree threshold for matchings in 5- and 6-uniform hypergraphs, in a strengthened form.